(n,k)-Besicovitch sets do not exist in Zpn and Zn for k 2
Abstract
Besicovitch showed that a compact set in Rn which contains a unit line segment in every direction can have measure 0. These constructions also work over other metric spaces like the p-adics and profinite integers. It is conjectured that it is impossible to construct sets with measure 0 which contain a unit 2-disk in every direction in Rn. We prove that over the p-adics and profinite integers any set which contains a 2-flat in every direction must have positive measure. The main ingredients are maximal Kakeya estimates for (Z/NZ)n proven in [Dha22] and adapting Fourier analytic arguments of Oberlin [Obe05]. In general, we prove Ln-1 to Ln-1 estimates for the maximal operator corresponding to 2-flats.
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